Open AccessLarge-Deviation Results for Discriminant Statistics of Gaussian Locally Stationary Processes
Author(s) -
Junichi Hirukawa
Publication year - 2012
Publication title -
advances in decision sciences
Language(s) - English
Resource type - Journals
SCImago Journal Rank - 0.178
H-Index - 13
eISSN - 2090-3367
pISSN - 2090-3359
DOI - 10.1155/2012/572919
Subject(s) - mathematics , gaussian , statistics , discriminant , large deviations theory , rate function , gaussian process , standard deviation , stationary process , quadratic equation , absolute deviation , linear discriminant analysis , computer science , artificial intelligence , physics , geometry , quantum mechanics
This paper discusses the large-deviation principle of discriminant statistics for Gaussian locally stationary processes. First, large-deviation theorems for quadratic forms and the log-likelihood ratio for a Gaussian locally stationary process with a mean function are proved. Their asymptotics are described by the large deviation rate functions. Second, we consider the situations where processes are misspecified to be stationary. In these misspecified cases, we formally make the log-likelihood ratio discriminant statistics and derive the large deviation theorems of them. Since they are complicated, they are evaluated and illustrated by numerical examples. We realize the misspecification of the process to be stationary seriously affecting our discrimination
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